Bounded multiplicative Toeplitz operators on sequence spaces

Abstract

In this paper, we study the linear mapping which sends the sequence x=(xn)n ∈ N to y=(yn)n ∈ N where yn = Σk=1∞ f(n/k)xk for f: Q+ C. This operator is the multiplicative analogue of the classical Toeplitz operator, and as such we denote the mapping by Mf. We show that for 1 ≤ p ≤ q ≤ ∞, if f ∈ r(Q+), then Mf:p q is bounded where 1r = 1 - 1p + 1q . Moreover, for the cases when p=1 with any q, p=q, and q=∞ with any p, we find that the operator norm is given by \|Mf\|p,q = \|f\|r,Q+ when f ≥ 0. Finding a necessary condition and the operator norm for the remaining cases highlights an interesting connection between the operator norm of Mf and elements in p that have a multiplicative structure, when considering f:N C. We also provide an argument suggesting that f ∈ r may not be a necessary condition for boundedness when 1<p<q<∞.